Question #19822

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Question #19822

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Answer 1 · 2016-12-30T15:23:17

$D . 5$ $D. 5$

Explanation:

Let $R$ $R$ be the radius of the incircle.

Radius of incircle of a right triangle $R = \frac{a \cdot b}{(a + b + c)}$ $R = (a*b)/((a+b+c)$ , where a and b are the legs of the triangle and c is the hypotenuse.

To get the largest possible radius of the incircle, 12 should be the smallest side of the triangle.

As this is a multiple-choice (objective) question, let's start with trying Option $D (R = 5)$ $D (R=5)$

Let $a$ $a$ be the smallest side = $12$ $12$
$\Rightarrow R = \frac{12 b}{12 + b + c} = 5$ $=> R=(12b)/(12+b+c)=5$

$\Rightarrow c = \frac{7 b - 60}{5}$ $=> c=(7b-60)/5$ ...............(1)

As the triangle is right-angled, $\Rightarrow c^{2} = a^{2} + b^{2}$ $=> c^2=a^2+b^2$
$\Rightarrow c^{2} = 144 + b^{2}$ $=> c^2=144+b^2$ ....... (2)

Substituting (1) into (2), we get $b = 35, c = 37$ $b=35, c=37$

So the triangle is in the ratio of : $12 : 35 : 37$ $12:35:37$

Check : $12^{2} + 35^{2} = 1369 = 37^{2}$ $12^2+35^2=1369=37^2$ , (OK)

$R = \frac{a \times b}{a + b + c} = \frac{12 \times 35}{12 + 35 + 37} = (\frac{420}{84}) = 5$ $R=(axxb)/(a+b+c)=(12xx35)/(12+35+37)=(420/84)=5$ ,

Hence, option $D$ $D$ is the answer.

...........................................................................................................

Footnote : the solution below is a much better one. A big "thank you" to $d k$ $dk$ _ $c h$ $ch$ for kindly providing such an excellent solution.

We have $c^{2} - b^{2} = 144$ $c^2−b^2=144$ , where $c$ $c$ is the hypotenuse and $b$ $b$ is another side. $c > b$ $c>b$ . By the given condition both $c and b$ $c and b$ are integers.

Now $(c + b) (c - b) = 144 = 72 \cdot 2$ $(c+b)(c−b)=144=72⋅2$ ...[1]

Here both $(c + b) and (c - b)$ $(c+b)and(c−b)$ are even integers as their product $144$ $144$ is even one.

To get maximum integer value satisfying the given condition both $c and b$ $c and b$ will have large integer value and the value of $c - b$ $c−b$ will have minimum possible even integer value.

So the minimum integer value of $(c - b)$ $(c−b)$ should be $2$ $2$ , i.e., $(c - b) = 2$ $(c−b)=2$ .

So from relation [1]

we have $(c + b) = 72 and (c - b) = 2$ $(c+b)=72 and (c−b)=2$

Thus we get $c = 37 and b = 35$ $c=37 and b=35$ .

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Question #19822

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